The infinitesimal subgroup of interpretable groups in some dp-minimal valued fields

Abstract

We continue our local analysis of groups interpretable in various dp-minimal valued fields, as introduced in [8]. We associate with every infinite group G interpretable in those fields an infinite type-definable infinitesimal subgroup (G), generated by the four infinitesimal subgroups D(G) associated with the distinguished sorts K, k, and K/O. To show that (G) is type-definable, we show that the resulting subgroups D(G) commute with each other as D ranges over the four distinguished sorts. We then study the basic properties of (G). Among others, we show that (G1× G2)=(G1)× (G2) and that if G1 G is a definable subgroup then (G1) is relatively definable in (G). We also discuss possible connections between dp-rk((G)) and elimination of imaginaries.

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